Real Analysis

MATH-6200

A careful study of measure theory, including abstract and Lebesgue measures and integration, absolute continuity and differentiation, L^p spaces, Fourier transforms and Fourier series, Hilbert spaces and normed linear spaces.

4 credits

Past Term Data

Offered
Not Offered
Offered as Cross-Listing Only
No Term Data
Spring Summer Fall
(Session 1) (Session 2)
2023
2022
2021
2020
Real Analysis (4c)
  • Bruce Piper
Seats Taken: 7/30
2019
2018
Real Analysis (4c)
  • Chjan C Lim
Seats Taken: 1/30
2017
2016
Real Analysis (4c)
  • David Isaacson
Seats Taken: 15/30
2015
2014
Real Analysis (4c)
  • David Isaacson
Seats Taken: 10/30
2013
2012
Real Analysis (4c)
  • David Isaacson
Seats Taken: 9/30
2011
2010
Real Analysis (4c)
  • Michael Zuker
Seats Taken: 6/20
2009
2008
Real Analysis (4c)
  • Harry W McLaughlin
Seats Taken: 13/30
2007
2006
Real Analysis (4c)
  • Chjan C Lim
Seats Taken: 5/30
2005
2004
Real Analysis (4c)
  • Victor Roytburd
Seats Taken: 10/30
2003
Real Analysis (4c)
  • Thomas Pok-Yin Yu
Seats Taken: 7/30
2002
Real Analysis (4c)
  • Thomas Pok-Yin Yu
Seats Taken: 4/30
2001
Real Analysis (4c)
  • Victor Roytburd
Seats Taken: 9/20
2000
Real Analysis (4c)
  • Thomas Pok-Yin Do Not Use Yu
Seats Taken: 5/20
1999
Real Analysis (4c)
  • George J Habetler
Seats Taken: 3/30
1998